N-Body Theory Revisited and its Extension to the pinnn-NNN Problem*

Abstract

In order to approach the pion--multinucleon problem, we have found it convenient to reformulate the general N--body theory starting from the fully unclusterized (i.e., N <- N) amplitude. If we rewrite such an amplitude in terms of new unknowns which can be later identified as the amplitudes for all the (N-1) <- (N-1) cluster processes, and repeat recursively the procedure up to the treatment of the 2 <- 2 cluster processes, we obtain very naturally the hierarchy of equations which ranges from the N--body fully--disconnected Lippmann--Schwinger equation to the N--body connected--kernel Yakubovskii--Grassberger--Sandhas one. This revisitation turns out to be very useful when considering the modifications required in case one of the bodies is a pion and the remaining are nucleons, with the pion being allowed to disappear and reappear through the action of a pion--nucleon vertex. In fact, we obtain a new set of coupled pion-- multinucleon equations which allow a consistent and simultaneous treatment of pion scattering and absorption. For the piNNN system, the kernel of these coupled equations is shown to be connected after three iterations.

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